Parabola Calculator | Calculator to solve Parabola Equation

We can find the x intercept, y intercept, vertex, focus, directrix, axis of symmetry using any parabola equation in the form of y = ax² + bx + c. In the following sections, we are providing the simple steps to find all those parameters of parabola equation. Follow them while solving the equation.

• At first, take any parabola equation.
• Find out a, b, c values in the given equation
• Substitute those values in the below formulae
• Vertex v (h, k).
• h = -b / (2a), k = c – b² / (4a).
• Focus of the x coordinate is -b/2a.
• Focus of the y coordinate is c – (b² – 1)/ (4a)
• Then, focus is (x, y)
• Directrix equation y = c – (b² + 1) / (4a)
• Axis of symmetry is -b/ 2a.
• Solve the y intercept by keeping x = 0 in the parabola equation.
• Perform all mathematical operations to get the required values.

Examples

Question 1: Find vertex, focus, y-intercept, x-intercept, directrix, and axis of symmetry for the parabola equation y = 5x² + 4x + 10?

Solution:

Given Parabola equation is y = 5x² + 4x + 10

The standard form of the equation is y = ax² + bx + c

So, a = 5, b = 4, c = 10

The parabola equation in vertex form is y = a(x-h)² + k

h = -b / (2a) = -4 / (2.5)

= -2/5

k = c – b² / (4a)

= 10 – 4² / (4.5)

= 10- 16 / 20 = 10*20 – 16 / 20

= 184/ 20 = 46/5

y = 5(x-(-2/5))² + 46/5

= 5(x+2/5)² + 46/5

Vertex is (-2/5, 46/5)

The focus of x coordinate = -b/ 2a = -2/5

Focus of y coordinate is = c – (b² – 1)/ (4a)

= 10 – (16 – 1) / (4.5)

= 10 – 15/20

= 37/4

Focus is (-2/5, 37/4)

Directrix equation y = c – (b² + 1) / (4a)

= 10 – (4² + 1) / (4.5)

= 10 – 17 / 20

=200 – 17 / 20

=183/20

Axis of Symmetry = -b/ 2a = -2/5

To get y-intercept put x = 0 in the equation

y = 5(0)² + 4(0) + 10

y = 10

To get x-intercept put y = 0 in the equation

0 = 5x² + 4x + 10

No x-intercept.

Question 2: Find the equation, focus, axis of symmetry, vertex, directrix, focal parameter, x-intercepts, y-intercepts of the parabola that passes through the points (1,4), (2,9), (−1,6)?

Solution:

Given points are (1,4), (2,9), (−1,6)

The standard form of the equation of the parabola is y = ax² + bx + c

When the parabola passes through the point (1,4) then, 4 = a+b+c

when the parabola passes through the point (2,9), then 9 = a(2)² + b(2) + c = 4a + 2b + c

when the parabola passes through the point (-1,6), then 6 = a – b + c

Solve first and third equation

a + b+ c = 4

a – b + c = 6

2(a + c) = 10

a + c = 10/2 = 5

substitute a + c = 5 in first equation

5 + b = 4

b = 4-5

b = -1

Put a = 5-c, b = -1 in second equation

4(5- c) -2 + c = 9

20 – 4c -2 +c = 9

18 – 3c = 9

18-9 = 3c

c = 3

Substitute b = -1 c = 3 in the third equation

a +1 + 3 = 6

a + 4 = 6

a = 2

Put a =2, b = -1, c = 3 in the standard form of parabola equation

y = 2x² – x + 3

The parabola equation in vertex form is y = a(x-h)² + k

h = -b / (2a) = 1/4

k = c – b² / (4a) = 3 – 1 / 8 = 23/8

y = 2(x-1/4)² + 23/8

Vertex is (1/4, 23/8)

The focus of x coordinate = -b/ 2a = 1/4

Focus of y coordinate is = c – (b² – 1)/ (4a)

= 3 – (1 – 1) / (4.2)

= 3/8

Focus is (1/4, 3/8)

Directrix equation y = c – (b² + 1) / (4a)

= 3 – (1 + 1) / (4.2)

= 3-2/8

=24-2/8 = 22/8 = 11/4

Axis of Symmetry = -b/ 2a = 1/4

To get y-intercept put x = 0 in the equation

y = 2(0)² – 0 + 3

y = 3

y intercept (0, 3)

To get x-intercept put y = 0 in the equation

0 = 2x² – x + 3

No x-intercept.

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